Standard

Dynamic buckling of a rod under axial jump loading. / Morozov, N.F.; Il'In, D.N.; Belyaev, A.K.

In: Doklady Physics, Vol. 58, No. 5, 2013, p. 191-195.

Research output: Contribution to journalArticle

Harvard

Morozov, NF, Il'In, DN & Belyaev, AK 2013, 'Dynamic buckling of a rod under axial jump loading', Doklady Physics, vol. 58, no. 5, pp. 191-195. https://doi.org/10.1134/S1028335813050078

APA

Morozov, N. F., Il'In, D. N., & Belyaev, A. K. (2013). Dynamic buckling of a rod under axial jump loading. Doklady Physics, 58(5), 191-195. https://doi.org/10.1134/S1028335813050078

Vancouver

Morozov NF, Il'In DN, Belyaev AK. Dynamic buckling of a rod under axial jump loading. Doklady Physics. 2013;58(5):191-195. https://doi.org/10.1134/S1028335813050078

Author

Morozov, N.F. ; Il'In, D.N. ; Belyaev, A.K. / Dynamic buckling of a rod under axial jump loading. In: Doklady Physics. 2013 ; Vol. 58, No. 5. pp. 191-195.

BibTeX

@article{5b2763b5aa624b04955fc57b59ebe73f,
title = "Dynamic buckling of a rod under axial jump loading",
abstract = "The problem of dynamic stability of a simply supported rod subjected to axial jump loading is considered. A systematic application of the method of expansion in terms of the normal axial and bending vibration modes is utilised. Longitudinal vibrations give rise to periodic longitudinal forces which in turn causes unstable bending vibrations. Application of the Galerkin approach results in a system of ordinary differential equations with periodic coefficients which are reduced to Mathieu equation. The instability regions whose form depends on the spectral properties of the longitudinal and flexural vibrations, damping values and longitudinal force are obtained. An example of unusual shapes of the instability regions is shown: the twelfth transverse mode caused by the first longitudinal mode turns out to be unstable for some parameters of the rod. The critical value of the jump load leading to instability of the considered transverse vibration modes is derived.",
author = "N.F. Morozov and D.N. Il'In and A.K. Belyaev",
year = "2013",
doi = "10.1134/S1028335813050078",
language = "English",
volume = "58",
pages = "191--195",
journal = "Doklady Physics",
issn = "1028-3358",
publisher = "МАИК {"}Наука/Интерпериодика{"}",
number = "5",

}

RIS

TY - JOUR

T1 - Dynamic buckling of a rod under axial jump loading

AU - Morozov, N.F.

AU - Il'In, D.N.

AU - Belyaev, A.K.

PY - 2013

Y1 - 2013

N2 - The problem of dynamic stability of a simply supported rod subjected to axial jump loading is considered. A systematic application of the method of expansion in terms of the normal axial and bending vibration modes is utilised. Longitudinal vibrations give rise to periodic longitudinal forces which in turn causes unstable bending vibrations. Application of the Galerkin approach results in a system of ordinary differential equations with periodic coefficients which are reduced to Mathieu equation. The instability regions whose form depends on the spectral properties of the longitudinal and flexural vibrations, damping values and longitudinal force are obtained. An example of unusual shapes of the instability regions is shown: the twelfth transverse mode caused by the first longitudinal mode turns out to be unstable for some parameters of the rod. The critical value of the jump load leading to instability of the considered transverse vibration modes is derived.

AB - The problem of dynamic stability of a simply supported rod subjected to axial jump loading is considered. A systematic application of the method of expansion in terms of the normal axial and bending vibration modes is utilised. Longitudinal vibrations give rise to periodic longitudinal forces which in turn causes unstable bending vibrations. Application of the Galerkin approach results in a system of ordinary differential equations with periodic coefficients which are reduced to Mathieu equation. The instability regions whose form depends on the spectral properties of the longitudinal and flexural vibrations, damping values and longitudinal force are obtained. An example of unusual shapes of the instability regions is shown: the twelfth transverse mode caused by the first longitudinal mode turns out to be unstable for some parameters of the rod. The critical value of the jump load leading to instability of the considered transverse vibration modes is derived.

U2 - 10.1134/S1028335813050078

DO - 10.1134/S1028335813050078

M3 - Article

VL - 58

SP - 191

EP - 195

JO - Doklady Physics

JF - Doklady Physics

SN - 1028-3358

IS - 5

ER -

ID: 7411527